(lim means lim ) x->∞ Given ε>0. Since lim f(x) = L, there exist M > 0 such that for x ≧ M, |f(x) - L| < ε/2. Consider [0,M+1] is a compact set, there exists δ1>0 such that |f(x)-f(y)| < ε whenever |x-y| < δ1. Let δ=min{δ1,1/2} If |x-y| < δ, WLOG we may assume, x > y; then there are two cases: (i) y ≧M (ii) y < M. For the first case, x>y≧M, so |f(x)-L|<ε/2 and |f(y)-L|<ε/2, hence |f(x)-f(y)| < ε For the second case, sine x-y<1/2, so x < 1/2 + y ≦ 1 + M. So, x,y are in [0,M+1]; consdier |x-y|< δ≦δ1, |f(x)-f(y)|< ε. Hence f is uniformly continuous on [0,oo) ※ 引述《VFresh (車干)》之銘言： : ※ 引述《wyob (Go Dolphins)》之銘言： : : If f:[0,∞)→R be a continuous function. Assume that limf(x)=L : : x→∞ : : where L is a finite number.Show that f is unifomly continuous on [0,∞) : : 感謝解惑 : 在此給的想法 建議原PO往此方向做做看 : lim f = L , 代表 x 夠大之後 f(x) 會與 L 很接近 : 換句話說 |f(x)-L|就會很小 : 因此對於所有 x,y 夠大之後 |f(x)-L|, |f(y)-L|就會很小 : 因此 |f(x)-f(y)|也會很小 : 那x 不夠大的時候呢? 考慮 前段是個 closed bounded interval : (因此是個compact set) 此函數連續 因此在此均勻連續. -- ※ 發信站: 批踢踢實業坊(ptt.cc) ◆ From: 114.25.53.139 ※ 編輯: VFresh 來自: 114.25.53.139 (01/08 19:30)